Sign up ×
Stack Overflow is a question and answer site for professional and enthusiast programmers. It's 100% free.

I need an array-like data structure with the fastest possible functional update. I've seen a few different implementation of flexible arrays that provide me with this property (Braun, Random Access Lists) but I'm wondering if there is an implementation that is specifically optimized for the case when we are not interested in append or prepend - just updates.

share|improve this question
Surely a map of some kind? –  Dominic Bou-Samra Feb 5 '13 at 3:41
@DominicBou-Samra an immutable map? wouldn't it be even costlier than the array? –  devoured elysium Feb 5 '13 at 3:43
Dominic, maps, Braun, and RAL are all tree based. I'm looking to see if there is maybe some clever combination with an imperative array (that is not mutated) that can beat a pure tree based data structure. –  rgrinberg Feb 5 '13 at 3:52
I'd imagine a HAMT ( is probably a good bet for you. It's basically like Haskell's IntMap but usually presented with a more Array-like interface (see for example Scala's Vector class or its counterpart in Clojure) –  copumpkin Feb 5 '13 at 5:30
copumpkin: a topical comment as a HAMT implementation for OCaml was released just a few days ago. See my answer for a simpler implementation of persistent arrays, close to the "version arrays" mentioned by Michael Day. –  gasche Feb 5 '13 at 9:25

3 Answers 3

up vote 11 down vote accepted

Jean-Cristophe Filliâtre has a very nice implementation of persistent arrays, that is described in the paper linked at the same page (which is about persistent union-find, of which persistent arrays are a core component). The code is directly available there.

The idea is that "the last version" of the array is represented as an usual array, with O(1) access and update operations, and previous versions are represented as this last version, plus a list of the differences. If you try to access a previous version of the structure, the array is "rerooted" to apply the list of differences and present you again the efficient representation.

This will of course not be O(1) under all workflows (if you constantly access and modify unrelated versions of the structure, you will pay rerooting costs frequently), but for the common workflow of mainly working with one version, and occasionally backtracking to an older version that becomes the "last version" again and gets the updates, this is very efficient. A very nice use of mutability hidden under a observationally pure interface.

share|improve this answer

I have a very good experience with repa (nice demo). Very good performance, automatic parallelism, multidimensional, polymorphic. Recommended to try.

share|improve this answer

Which language are you using? In Haskell you can use mutable arrays with the state monad, and in Mercury you can use mutable arrays by threading the IO state. Ocaml also has an array module, which unfortunately does not maintain referential transparency, if that is what you are after.

share|improve this answer
I'm using OCaml. I tagged the question as Haskell as to tap the community's knowledge of these things. Btw, I'm not sure how STArray will solve my problem of using updating an array while keeping the old copy available efficiently. –  rgrinberg Feb 5 '13 at 3:58
OCaml arrays are mutable, they don't have persistence. Constant-time access with updates and persistence seems pretty difficult if not impossible. So, a map is probably what you want (as suggested above). –  Jeffrey Scofield Feb 5 '13 at 4:12
There are many different map based implementations, I'm looking for the best for my use case. For example a balanced BST would be terrible for this application. Although the asymptotic performance is the same. –  rgrinberg Feb 5 '13 at 4:17
Mercury has version arrays, which offer O(1) access to the latest version of the array and O(n) access to older versions, where n is the number of updates that have been made since the old version. –  Michael Day Feb 5 '13 at 4:26

Your Answer


By posting your answer, you agree to the privacy policy and terms of service.

Not the answer you're looking for? Browse other questions tagged or ask your own question.